Convert Newton's gravitational constant G=6.67430×10−11 m3kg−1s−2G = 6.67430 \times 10^{-11} \text{ m}^3\text{kg}^{-1}\text{s}^{-2}G=6.67430×10−11 m3kg−1s−2 to astronomical units, solar masses, and years (1 AU≈1.49598×1011 m1 \text{ AU} \approx 1.49598 \times 10^{11} \text{ m}1 AU≈1.49598×1011 m, 1 M⊙≈1.98847×1030 kg1 \text{ M}_\odot \approx 1.98847 \times 10^{30} \text{ kg}1 M⊙≈1.98847×1030 kg, and 1 year≈3.15576×107 s1 \text{ year} \approx 3.15576 \times 10^7 \text{ s}1 year≈3.15576×107 s). What is the value of GGG in AU3M⊙−1year−2\text{AU}^3 \text{M}_\odot^{-1} \text{year}^{-2}AU3M⊙−1year−2?
39.48 AU3M⊙−1year−239.48 \text{ AU}^3\text{M}_\odot^{-1}\text{year}^{-2}39.48 AU3M⊙−1year−2
39.48×103 AU3M⊙−1year−239.48 \times 10^3 \text{ AU}^3\text{M}_\odot^{-1}\text{year}^{-2}39.48×103 AU3M⊙−1year−2
1.48×10−3 AU3M⊙−1year−21.48 \times 10^{-3} \text{ AU}^3\text{M}_\odot^{-1}\text{year}^{-2}1.48×10−3 AU3M⊙−1year−2
39.48×10−3 AU3M⊙−1year−239.48 \times 10^{-3} \text{ AU}^3\text{M}_\odot^{-1}\text{year}^{-2}39.48×10−3 AU3M⊙−1year−2